A construction of right groups from a connected groupoid

The quantum completion Ā of the space of connections in a manifold can be seen as the set of all morphisms from the groupoid of the edges of the manifold to the (compact) gauge group. This algebraic construction generalizes an analogous description of the gauge-invariant quantum configuration space

INTRODUUTION By a 8-groupoid is meant a group object in the category of groupoids. By a crossed m&.&. (A, B, b) is meant a pair A, B of groups together with an operation of the group B on the group A, and a morphism b: A + B of groups, satisfying: (i) b(a\*

## We given a new version of a theorem of Clay concerning the construction of BIB designs from Frobenius groups. In a recent paper [l] Clay describes a method of constructing BIB designs from Frobenius groups. Let G = N X @ be a Frobenius group with kernel N and complement @. With the same notatio